If several cats have ten more paws than ears, how many cats are there? - briefly
Cats typically have four paws and two ears. To determine the number of cats, consider that each cat has two more paws than ears. Therefore, the number of cats is five.
If several cats have ten more paws than ears, how many cats are there? - in detail
To determine the number of cats given the condition that they have ten more paws than ears, we need to analyze the biological characteristics of cats and apply logical reasoning.
Cats typically have four paws and two ears. This is a standard biological fact that applies to all domestic cats. Therefore, for any given cat, the number of paws is always four, and the number of ears is always two. This means that the difference between the number of paws and ears for any single cat is always two.
Now, let's consider the condition that several cats collectively have ten more paws than ears. To find the number of cats, we need to determine how many times the difference of two (paws minus ears for one cat) can fit into the total difference of ten.
To solve this, we can set up a simple equation. Let ( n ) represent the number of cats. Each cat contributes four paws and two ears. Therefore, the total number of paws for ( n ) cats is ( 4n ), and the total number of ears is ( 2n ). The condition states that the total number of paws exceeds the total number of ears by ten:
[ 4n - 2n = 10 ]
Simplifying this equation:
[ 2n = 10 ]
Dividing both sides by 2:
[ n = 5 ]
Therefore, there are five cats. This conclusion is derived from the biological facts about cats and the logical application of the given condition. The solution is straightforward and relies on basic arithmetic and an understanding of feline anatomy.